[1]龚攀,肖丽鹏.某类高阶复微分方程解的增长性[J].江西师范大学学报(自然科学版),2014,(05):512-516.
 GONG Pan,XIAO Li-peng.The Growth of Solutions of a Class of Higher Order Complex Differential Equations[J].Journal of Jiangxi Normal University:Natural Science Edition,2014,(05):512-516.
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某类高阶复微分方程解的增长性()
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《江西师范大学学报》(自然科学版)[ISSN:1006-6977/CN:61-1281/TN]

卷:
期数:
2014年05期
页码:
512-516
栏目:
出版日期:
2014-10-31

文章信息/Info

Title:
The Growth of Solutions of a Class of Higher Order Complex Differential Equations
作者:
龚攀;肖丽鹏
江西师范大学数学与信息科学学院,江西 南昌,330022
Author(s):
GONG Pan;XIAO Li-peng
关键词:
微分方程角域增长级
Keywords:
differential equationsangular domainthe order of growth
分类号:
O174.52
文献标志码:
A
摘要:
主要研究高阶微分方程 f(k)+∑k-1 j =1 Pj(e -z )f(j)+ Q(z)f =0解的增长性,其中 Q(z)是有限级超越整函数,Pj(e -z )(j =1,2,…,k -1)为 e -z 的非常数多项式。当 Q(z)满足一定条件时,该微分方程的任意非平凡解为无穷级解,并讨论了对应的非齐次微分方程解的增长性。
Abstract:
The growth of solutions of the higher order linear differential equations f(k)+∑k-1j=1 Pj(e-z)f(j)+Q(z)f =0 are discussed,where Q( z)is a transcendental entire function of finite order,and Pj( e-z )are non-constant polyno-mials. Some conditions on Q( z)are given which can guarantee that every non-rivial solution of the equation is infi-nite order,the growth of solutions to the corresponding non-homogeneous differential equation is discussed.

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[12]许淑娟,易才凤.高阶线性微分方程的解在角域内的增长性及Borel方向[J].江西师范大学学报(自然科学版),2013,(04):401.
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备注/Memo

备注/Memo:
国家自然科学基金(11301232,11171119);江西省自然科学基金(20132BAB211009);江西省教育厅青年科学基金(GJJ12207)
更新日期/Last Update: 1900-01-01